English

Conic Mixed-Binary Sets: Convex Hull Characterizations and Applications

Optimization and Control 2023-12-29 v4

Abstract

We consider a general conic mixed-binary set where each homogeneous conic constraint jj involves an affine function of independent continuous variables and an epigraph variable associated with a nonnegative function, fjf_j, of common binary variables. Sets of this form naturally arise as substructures in a number of applications including mean-risk optimization, chance-constrained problems, portfolio optimization, lot-sizing and scheduling, fractional programming, variants of the best subset selection problem, a class of sparse semidefinite programs, and distributionally robust chance-constrained programs. We give a convex hull description of this set that relies on simultaneous characterization of the epigraphs of fjf_j's, which is easy to do when all functions fjf_j's are submodular. Our result unifies and generalizes an existing result in two important directions. First, it considers \emph{multiple general convex cone} constraints instead of a single second-order cone type constraint. Second, it takes \emph{arbitrary nonnegative functions} instead of a specific submodular function obtained from the square root of an affine function. We close by demonstrating the applicability of our results in the context of a number of problem classes.

Keywords

Cite

@article{arxiv.2012.14698,
  title  = {Conic Mixed-Binary Sets: Convex Hull Characterizations and Applications},
  author = {Fatma Kılınç-Karzan and Simge Küçükyavuz and Dabeen Lee and Soroosh Shafieezadeh-Abadeh},
  journal= {arXiv preprint arXiv:2012.14698},
  year   = {2023}
}

Comments

21 pages

R2 v1 2026-06-23T21:32:55.300Z